Projective convergence of columns for inhomogeneous products of matrices with nonnegative entries

Abstract

Let Pn be the n-step right product A1·s An, where A1,A2,… is a given infinite sequence of d× d matrices with nonnegative entries. In a wide range of situations, the normalized matrix product Pn/ Pn does not converge and we shall be rather interested in the asymptotic behavior of the normalized columns PnUi/ PnUi, where U1,…,Ud are the canonical d× 1 vectors. Our main result in Theorem~A gives a sufficient condition (C) over the sequence A1,A2,… ensuring the existence of dominant columns of Pn, having the same projective limit V: more precisely, for any rank n, there exists a partition of \1,…,d\ made of two subsets Jn and Jnc such that each one of the sequences of normalized columns, say PnUjn/ PnUjn with jn∈ Jn tends to V as n tends to +∞ and are dominant in the sense that the ratio PnUjn'/ PnUjn tends to 0, as soon as jn'∈ Jnc. The existence of sequences of such dominant columns implies that for any probability vector X with positive entries, the probability vector PnX/ PnX, converges as n tends to +∞. Our main application of Theorem~A (and our initial motivation) is related to an Erd os problem concerned with a family of probability measures μβ (for 1<β<2 a real parameter) fully supported by a subinterval of the real line, known as Bernoulli convolutions.